Add to ORKGWe find a description of the restriction of doubly stochastic maps to separable abelian C ∗ -subalgebras of a II1 factor M. We use this local form of doubly stochastic maps to develop a notion of joint majorization between ntuples of mutually commuting self-adjoint operators that extends those of Kamei (for single self-adjoint operators) and Hiai (for single normal operators) in the II1 factor case. Several characterizations of this joint majorization are obtained. As a byproduct we prove that any separable abelian C ∗ -subalgebra of M can be embedded into a separable abelian C ∗ -subalgebra of M with diffuse spectral measure.Facultad de Ciencias Exacta
AbstractIn this paper we use doubly stochastic operators to extend the notion of majorization on lp,...
AbstractWe study subpolytopes Ωn(d) of the Birkhoff polytope Ωn of doubly stochastic matrices of ord...
AbstractSuppose A, D1,…,Dm are n × n matrices where A is self-adjoint, and let X = Σmk = 1DkAD∗k. It...
We find a description of the restriction of doubly stochastic maps to separable abelian C ∗ -subalge...
We describe majorization between selfadjoint operators in a ρ-finite II∞ factor (M, τ) in terms of s...
Abstract1. Basic properties of majorization. 2. Isotone maps and algebraic operations. 3. Double sub...
We describe majorization between selfadjoint operators in a semi-finite II_\infty factor (M;\tau) in...
We study refinements between spectral resolutions in an arbitrary II1 factor M and obtain diffuse (m...
We prove a variety of results describing the diagonals of tuples of commuting hermitian operators in...
Given X, Y ∈ Rn×m we introduce the following notion of matrix majorization, called weak matrix major...
AbstractLet y be majorized by x. We investigate the polytope of doubly stochastic matrices D for whi...
Let A ⊆ Mn(C) be a unital ∗-subalgebra of the algebra Mn(C) of all n×n complex matrices and let B be...
We prove a contractive version of the Schur–Horn theorem for submajorization in II1 factors that com...
AbstractLet Ol≅L∞(S, μ) be a maximal abelian subalgebra of the factor F on separable Hilbert space w...
AbstractGiven X,Y∈Rn×m we introduce the following notion of matrix majorization, called weak matrix ...
AbstractIn this paper we use doubly stochastic operators to extend the notion of majorization on lp,...
AbstractWe study subpolytopes Ωn(d) of the Birkhoff polytope Ωn of doubly stochastic matrices of ord...
AbstractSuppose A, D1,…,Dm are n × n matrices where A is self-adjoint, and let X = Σmk = 1DkAD∗k. It...
We find a description of the restriction of doubly stochastic maps to separable abelian C ∗ -subalge...
We describe majorization between selfadjoint operators in a ρ-finite II∞ factor (M, τ) in terms of s...
Abstract1. Basic properties of majorization. 2. Isotone maps and algebraic operations. 3. Double sub...
We describe majorization between selfadjoint operators in a semi-finite II_\infty factor (M;\tau) in...
We study refinements between spectral resolutions in an arbitrary II1 factor M and obtain diffuse (m...
We prove a variety of results describing the diagonals of tuples of commuting hermitian operators in...
Given X, Y ∈ Rn×m we introduce the following notion of matrix majorization, called weak matrix major...
AbstractLet y be majorized by x. We investigate the polytope of doubly stochastic matrices D for whi...
Let A ⊆ Mn(C) be a unital ∗-subalgebra of the algebra Mn(C) of all n×n complex matrices and let B be...
We prove a contractive version of the Schur–Horn theorem for submajorization in II1 factors that com...
AbstractLet Ol≅L∞(S, μ) be a maximal abelian subalgebra of the factor F on separable Hilbert space w...
AbstractGiven X,Y∈Rn×m we introduce the following notion of matrix majorization, called weak matrix ...
AbstractIn this paper we use doubly stochastic operators to extend the notion of majorization on lp,...
AbstractWe study subpolytopes Ωn(d) of the Birkhoff polytope Ωn of doubly stochastic matrices of ord...
AbstractSuppose A, D1,…,Dm are n × n matrices where A is self-adjoint, and let X = Σmk = 1DkAD∗k. It...